Isolation of the diamond graph

Abstract

A graph is H-free if it does not contain H as a subgraph. The diamond graph is the graph obtained from K4 by deleting one edge. We prove that if G is a connected graph with order n≥ 10, then there exists a subset S⊂eq V(G) with |S|≤ n/5 such that the graph induced by V(G) N[S] is diamond-free, where N[S] is the closed neighborhood of S. Furthermore, the bound is sharp.

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